Wide subcategories and lattices of torsion classes

Abstract

In this paper, we study the relationship between wide subcategories and torsion classes of an abelian length category A from the point of view of lattice theory. Motivated by τ-tilting reduction of Jasso, we mainly focus on intervals [U,T] in the lattice tors A of torsion classes in A such that W:=U T is a wide subcategory of A; we call these intervals wide intervals. We prove that a wide interval [U,T] is isomorphic to the lattice tors W of torsion classes in the abelian category W. We also characterize wide intervals in two ways: First, in purely lattice theoretic terms based on the brick labeling established by Demonet--Iyama--Reading--Reiten--Thomas; and second, in terms of the Ingalls--Thomas correspondences between torsion classes and wide subcategories, which were further developed by Marks--Stov\'icek.